2.3
An m*n upper triangular matrix is one whose entries below the main diagonal are zeros, as is shown in the matrix to the right. When is a square upper triangular matrix invertible? Justify your answer.
A square upper triangular matrix is invertible when all entries on its main diagonal are nonzero. If all of the entries on its main diagonal are nonzero, then the nxn matrix has n pivot positions.
If A is an nxn matrix, then the equation Ax=b has at least one solution for each b in set of real numbers (ℝn).
False; by the Invertible Matrix Theorem Ax=b has at least one solution for each b in set of real numbers (ℝn) only if a matrix is invertible.
If the linear transformation (x) maps to↦ Ax maps set of real numbers ℝn into set of real numbers ℝn, then A has n pivot positions.
False; the linear transformation (x) maps to↦ Ax will always map set of real numbers ℝn into set of real numbers ℝn for any n×n matrix. According to the Invertible Matrix Theorem A has n pivot positions only if x(x) ↦ Ax maps set of real numbers ℝn onto set of real numbers ℝn.
Explain why the columns of A^2 span set of real numbers ℝn whenever the columns of an n×n matrix A are linearly independent.
If the columns of A are linearly independent and A is square, then A is invertible, by the IMT. Thus, A^2, which is the product of invertible matrices, is also invertible. So, by the IMT, the columns of A^2 span set of real numbers ℝn.
If A is invertible, then the columns of A^(−1) are linearly independent. Explain why.
It is a known theorem that if A is invertible then A−1 must also be invertible. According to the Invertible Matrix Theorem, if a matrix is invertible its columns form a linearly independent set. Therefore, the columns of A−1 are linearly independent.
If C is 6×6 matrix and the equation Cx=v is consistent for every v in set of real numbers ℝ6, is it possible that for some v, the equation Cx=v has more than one solution? Why or why not?
It is not possible. Since Cx=v is consistent for every v in set of real numbers ℝ6, according to the Invertible Matrix Theorem that makes the 6×6 matrix invertible. Since it is invertible, Cx=v has a unique solution.
Let A and B be nx n matrices. Show that if AB is invertible so is B.
Let W be the inverse of AB. Then WAB=I and (WA)B=I. Therefore, matrix B is invertible by part (j) of the IMT.
Can a square matrix with two identical columns be invertible? Why or why not?
The matrix is not invertible. If a matrix has two identical columns then its columns are linearly dependent. According to the Invertible Matrix Theorem this makes the matrix not invertible.
if there is a b in set of real numbers Rn such that the equation Ax=b is inconsistent, then the transformation x maps to x↦ Ax is not one-to-one.
True; according to the Invertible Matrix Theorem if there is a b in set of real numbers ℝn such that the equation Ax=b is inconsistent, then equation Ax=b does not have at least one solution for each b in set of real numbers ℝn and this makes A not invertible.
If the equation Ax=b has at least one solution for each b in set of real numbers ℝn, then the solution is unique for each b.
True; by the Invertible Matrix Theorem if Ax=b has at least one solution for each b in set of real numbers ℝn, then matrix A is invertible. If A is invertible, then according to the invertible matrix theorem the solution is unique for each b.
If the columns of A are linearly independent, then the columns of A span set of real numbers ℝn.
True; by the Invertible Matrix Theorem if the columns of A are linearly independent, then the columns of A must span set of real numbers ℝn.
If there is a nxn matrix D such that ADequals=I, then there is also an nxn matrix C such that CA=I.
True; by the Invertible Matrix Theorem, if there is an nxn matrix D such that AD=I, then it must be true that there is also an nxn matrix C such that CA=I.
Is it possible for a 5x5 matrix to be invertible when its columns do not span set of real numbers ℝ5? Why or why not?
it is not possible; according to the Invertible Matrix Theorem an n×n matrix cannot be invertible when its columns do not span set of real numbers ℝn.
if A^(T) is not invertible, then A is not invertible.
true; by the Invertible Matrix Theorem if A^(T) is not invertible all statements in the theorem are false, including A is invertible. Therefore, A is not invertible.
